(1)/(x-1)-(1)/(x+5)=(6)/(7),x!=1,-5...

(1)/(x-1)-(1)/(x+5)=(6)/(7),x!=1,-5

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solve by factorisation: 3x^(2)-2sqrt(6)x+2=0 and (1)/(x-1)-(1)/(x+5)=(6)/(7)

Solve by factorization: (x+1)/(x-1)-(x-1)/(x+1)=(5)/(6),x!=1,-1

solve for x,(1)/(x-3)-(1)/(x+5)=(1)/(6)

Solve by factorization: (x+1)/(x-1)-(x-1)/(x+1)=5/6,\ \ x!=1,\ -1

(x-1)/(x-2)-(x-2)/(x-3)=(x-5)/(x-6)-(x-6)/(x-7)

3((7x+1)/(5x-3))-4((5x-3)/(7x+1))=11;x!=(3)/(5),-(1)/(7)

int(1)/((2x+1)^((5)/(6))(3x+5)^((7)/(6)))dx=

int (1)/((2x+1)^((5)/(6))(3x+5)^((7)/(6)))dx=

The least integral value of f(x)=((x-1)^(7)+3(x-1)^(6)+(x-1)^(5)+1)/(x-1)^(5) , AAx gt 1 is

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